{
 "cells": [
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "# Barren Plateaus\n",
    "\n",
    "<em> Copyright (c) 2021 Institute for Quantum Computing, Baidu Inc. All Rights Reserved. </em>"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "## Overview\n",
    "\n",
    "In the training of classical neural networks, gradient-based optimization methods encounter the problem of local minimum and saddle points. Correspondingly, the Barren plateau phenomenon could potentially block us from efficiently training quantum neural networks. This peculiar phenomenon was first discovered by McClean et al. in 2018 [[arXiv:1803.11173]](https://arxiv.org/abs/1803.11173). In few words, when we randomly initialize the parameters in random circuit structure meets a certain degree of complexity, the optimization landscape will become very flat, which makes it difficult for the optimization method based on gradient descent to find the global minimum. For most variational quantum algorithms (VQE, etc.), this phenomenon means that when the number of qubits increases, randomly choose a circuit ansatz and randomly initialize the parameters of it may not be a good idea. This will make the optimization landscape corresponding to the loss function into a huge plateau, which makes the quantum neural network's training much more difficult. The initial random value for the optimization process is very likely to stay inside this plateau, and the convergence time of gradient descent will be prolonged.\n",
    "\n",
    "![BP-fig-barren](./figures/BP-fig-barren.png)\n",
    "\n",
    "The figure is generated through [Gradient Descent Viz](https://github.com/lilipads/gradient_descent_viz)\n",
    "\n",
    "This tutorial mainly discusses how to show the barren plateau phenomenon with Paddle Quantum. Although it does not involve any algorithm innovation, it can improve readers' understanding about gradient-based training for quantum neural network. We first introduce the necessary libraries and packages:"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 1,
   "metadata": {
    "ExecuteTime": {
     "end_time": "2021-03-02T12:13:41.746113Z",
     "start_time": "2021-03-02T12:13:39.017668Z"
    }
   },
   "outputs": [],
   "source": [
    "import time\n",
    "import numpy as np\n",
    "from matplotlib import pyplot as plt \n",
    "import paddle\n",
    "from paddle import matmul\n",
    "from paddle_quantum.circuit import UAnsatz\n",
    "from paddle_quantum.utils import dagger\n",
    "from paddle_quantum.state import density_op"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "## Random network structure\n",
    "\n",
    "Here we follow the original method mentioned in the paper by McClean (2018) and build the following random circuit (currently we do not support the built-in control-Z gate, use CNOT instead):\n",
    "\n",
    "![BP-fig-Barren_circuit](./figures/BP-fig-Barren_circuit.png)\n",
    "\n",
    "First, we rotate all the qubits around the $y$-axis of the Bloch sphere with rotation gates $R_y(\\pi/4)$.\n",
    "\n",
    "The remaining structure forms a block, each block can be further divided into two layers:\n",
    "\n",
    "- Build a layer of random rotation gates on all the qubits, where $R_{\\ell,n} \\in \\{R_x, R_y, R_z\\}$. The subscript $\\ell$ means the gate is in the $\\ell$-th repeated block. In the figure above, $\\ell =1$. The second subscript $n$ indicates which qubit it acts on.\n",
    "- The second layer is composed of CNOT gates, which act on adjacent qubits.\n",
    "\n",
    "In Paddle Quantum, we can build this circuit with the following code:"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 2,
   "metadata": {
    "ExecuteTime": {
     "end_time": "2021-03-02T12:13:41.776722Z",
     "start_time": "2021-03-02T12:13:41.749182Z"
    }
   },
   "outputs": [],
   "source": [
    "def rand_circuit(theta, target, num_qubits):\n",
    "\n",
    "    # We need to convert Numpy array to Tensor in PaddlePaddle\n",
    "    const = paddle.to_tensor(np.array([np.pi/4]))\n",
    "    \n",
    "    # Initialize the quantum circuit\n",
    "    cir = UAnsatz(num_qubits)\n",
    "    \n",
    "    # ============== First layer ==============\n",
    "    # Fixed-angle Ry rotation gates \n",
    "    for i in range(num_qubits):\n",
    "        cir.ry(const, i)\n",
    "\n",
    "    # ============== Second layer ==============\n",
    "    # Target is a random array help determine rotation gates\n",
    "    for i in range(num_qubits):\n",
    "        if target[i] == 0:\n",
    "            cir.rz(theta[i], i)\n",
    "        elif target[i] == 1:\n",
    "            cir.ry(theta[i], i)\n",
    "        else:\n",
    "            cir.rx(theta[i], i)\n",
    "            \n",
    "    # ============== Third layer ==============\n",
    "    # Build adjacent CNOT gates\n",
    "    for i in range(num_qubits - 1):\n",
    "        cir.cnot([i, i + 1])\n",
    "        \n",
    "    return cir.U"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "## Loss function and optimization landscape\n",
    "\n",
    "After determining the circuit structure, we also need to define a loss function to determine the optimization landscape. Following the same set up with McClean (2018), we take the loss function from VQE:\n",
    "\n",
    "$$\n",
    "\\mathcal{L}(\\boldsymbol{\\theta})= \\langle0| U^{\\dagger}(\\boldsymbol{\\theta})H U(\\boldsymbol{\\theta}) |0\\rangle,\n",
    "\\tag{1}\n",
    "$$\n",
    "\n",
    "The unitary matrix $U(\\boldsymbol{\\theta})$ is the quantum neural network with the random structure we built from the last section. For Hamiltonian $H$, we also take the simplest form $H = |00\\cdots 0\\rangle\\langle00\\cdots 0|$. After that, we can start sampling gradients with the two-qubit case - generate 300 sets of random network structures and different random initial parameters $\\{\\theta_{\\ell,n}^{( i)}\\}_{i=1}^{300}$. Each time the partial derivative with respect to the **first parameter $\\theta_{1,1}$** is calculated according to the analytical gradient formula from VQE. Then analyze the mean and variance of these 300 sampled partial gradients. The formula for the analytical gradient is:\n",
    "\n",
    "$$\n",
    "\\partial \\theta_{j} \n",
    "\\equiv \\frac{\\partial \\mathcal{L}}{\\partial \\theta_j}\n",
    "= \\frac{1}{2} \\big[\\mathcal{L}(\\theta_j + \\frac{\\pi}{2}) - \\mathcal{L}(\\theta_j - \\frac{\\pi}{2})\\big].\n",
    "\\tag{2}\n",
    "$$\n",
    "\n",
    "For a detailed derivation, see [arXiv:1803.00745](https://arxiv.org/abs/1803.00745)."
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 3,
   "metadata": {
    "ExecuteTime": {
     "end_time": "2021-03-02T12:13:50.788968Z",
     "start_time": "2021-03-02T12:13:41.786234Z"
    }
   },
   "outputs": [
    {
     "name": "stdout",
     "output_type": "stream",
     "text": [
      "The main program segment has run in total  5.674382448196411  seconds\n",
      "Use  300  samples to get the mean value of the gradient of the random network's first parameter, and we have： 0.005925709445960606\n",
      "Use  300 samples to get the variance of the gradient of the random network's first parameter, and we have： 0.028249053148446363\n"
     ]
    }
   ],
   "source": [
    "# Hyper parameter settings\n",
    "np.random.seed(42)   # Fixed Numpy random seed\n",
    "N = 2                # Set the number of qubits\n",
    "samples = 300        # Set the number of sampled random network structures\n",
    "THETA_SIZE = N       # Set the size of the parameter theta\n",
    "ITR = 1              # Set the number of iterations\n",
    "LR = 0.2             # Set the learning rate\n",
    "SEED = 1             # Fixed the randomly initialized seed in the optimizer\n",
    "\n",
    "# Initialize the register for the gradient value\n",
    "grad_info = []\n",
    "\n",
    "paddle.seed(SEED)\n",
    "class manual_gradient(paddle.nn.Layer):\n",
    "    \n",
    "    # Initialize a list of learnable parameters and fill the initial value with a uniform distribution of [0, 2*pi]\n",
    "    def __init__(self, shape, param_attr= paddle.nn.initializer.Uniform(\n",
    "        low=0.0, high=2 * np.pi),dtype='float64'):\n",
    "        super(manual_gradient, self).__init__()\n",
    "        \n",
    "        # Convert Numpy array to Tensor in PaddlePaddle\n",
    "        self.H = paddle.to_tensor(density_op(N))\n",
    "        \n",
    "    # Define loss function and forward propagation mechanism  \n",
    "    def forward(self):\n",
    "        \n",
    "        # Initialize three theta parameter lists\n",
    "        theta_np = np.random.uniform(low=0., high= 2 * np.pi, size=(THETA_SIZE))\n",
    "        theta_plus_np = np.copy(theta_np) \n",
    "        theta_minus_np = np.copy(theta_np) \n",
    "        \n",
    "        # Modified to calculate analytical gradient\n",
    "        theta_plus_np[0] += np.pi/2\n",
    "        theta_minus_np[0] -= np.pi/2\n",
    "        \n",
    "        # Convert Numpy array to Tensor in PaddlePaddle\n",
    "        theta = paddle.to_tensor(theta_np)\n",
    "        theta_plus = paddle.to_tensor(theta_plus_np)\n",
    "        theta_minus = paddle.to_tensor(theta_minus_np)\n",
    "        \n",
    "        # Generate random targets, randomly select circuit gates in rand_circuit\n",
    "        target = np.random.choice(3, N)      \n",
    "        \n",
    "        U = rand_circuit(theta, target, N)\n",
    "        U_dagger = dagger(U) \n",
    "        U_plus = rand_circuit(theta_plus, target, N)\n",
    "        U_plus_dagger = dagger(U_plus) \n",
    "        U_minus = rand_circuit(theta_minus, target, N)\n",
    "        U_minus_dagger = dagger(U_minus) \n",
    "\n",
    "        # Calculate the analytical gradient\n",
    "        grad = (paddle.real(matmul(matmul(U_plus_dagger, self.H), U_plus))[0][0]  \n",
    "                - paddle.real(matmul(matmul(U_minus_dagger, self.H), U_minus))[0][0])/2 \n",
    "        \n",
    "        return grad\n",
    "\n",
    "# Define the main block\n",
    "def main():\n",
    "\n",
    "    # Set the dimension of QNN\n",
    "    sampling = manual_gradient(shape=[THETA_SIZE])\n",
    "        \n",
    "    # Sampling to obtain gradient information\n",
    "    grad = sampling()   \n",
    "        \n",
    "    return grad.numpy()\n",
    "\n",
    "# Record running time\n",
    "time_start = time.time()\n",
    "\n",
    "# Start sampling\n",
    "for i in range(samples):\n",
    "    if __name__ == '__main__':\n",
    "        grad = main()\n",
    "        grad_info.append(grad)\n",
    "\n",
    "time_span = time.time() - time_start\n",
    "\n",
    "print('The main program segment has run in total ', time_span, ' seconds')\n",
    "print(\"Use \", samples, \" samples to get the mean value of the gradient of the random network's first parameter, and we have：\", np.mean(grad_info))\n",
    "print(\"Use \", samples, \"samples to get the variance of the gradient of the random network's first parameter, and we have：\", np.var(grad_info))"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "## Visualization of the Optimization landscape\n",
    "\n",
    "Next, we use Matplotlib to visualize the optimization landscape. In the case of **two qubits**, we only have two parameters $\\theta_1$ and $\\theta_2$, and there are 9 possibilities for the random circuit structure in the second layer. \n",
    "\n",
    "![BP-fig-landscape2](./figures/BP-fig-landscape2.png)\n",
    "\n",
    "The plain structure shown in the $R_z$-$R_z$ layer from the last figure is something we should avoid. In this case, it's nearly impossible to converge to the theoretical minimum. If you want to try to draw some optimization landscapes yourself, please refer to the following code:"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 4,
   "metadata": {
    "ExecuteTime": {
     "end_time": "2021-03-02T12:14:18.147473Z",
     "start_time": "2021-03-02T12:14:14.551262Z"
    }
   },
   "outputs": [
    {
     "data": {
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\n",
      "text/plain": [
       "<Figure size 960x288 with 2 Axes>"
      ]
     },
     "metadata": {
      "needs_background": "light"
     },
     "output_type": "display_data"
    },
    {
     "name": "stdout",
     "output_type": "stream",
     "text": [
      "The main program segment has run in total  1.9106006622314453  seconds\n"
     ]
    }
   ],
   "source": [
    "# Introduce the necessary packages\n",
    "from matplotlib import cm\n",
    "from mpl_toolkits.mplot3d import Axes3D\n",
    "from matplotlib.ticker import LinearLocator, FormatStrFormatter\n",
    "\n",
    "time_start = time.time()\n",
    "N = 2\n",
    "\n",
    "# Set the image ratio Vertical: Horizontal = 0.3\n",
    "fig = plt.figure(figsize=plt.figaspect(0.3))\n",
    "\n",
    "# Generate points on the x, y axis\n",
    "X = np.linspace(0, 2 * np.pi, 80)\n",
    "Y = np.linspace(0, 2 * np.pi, 80)\n",
    "\n",
    "# Generate 2D mesh\n",
    "xx, yy = np.meshgrid(X, Y)\n",
    "\n",
    "\n",
    "# Define the necessary logic gates\n",
    "def rx(theta):\n",
    "    mat = np.array([[np.cos(theta/2), -1j * np.sin(theta/2)],\n",
    "                    [-1j * np.sin(theta/2), np.cos(theta/2)]])\n",
    "    return mat\n",
    "\n",
    "def ry(theta):\n",
    "    mat = np.array([[np.cos(theta/2), -1 * np.sin(theta/2)],\n",
    "                    [np.sin(theta/2), np.cos(theta/2)]])\n",
    "    return mat\n",
    "\n",
    "def rz(theta):\n",
    "    mat = np.array([[np.exp(-1j * theta/2), 0],\n",
    "                    [0, np.exp(1j * theta/2)]])\n",
    "    return mat\n",
    "\n",
    "def CNOT():\n",
    "    mat = np.array([[1,0,0,0],[0,1,0,0],[0,0,0,1],[0,0,1,0]])\n",
    "    return mat\n",
    "\n",
    "# ============= The first figure =============\n",
    "# We visualize the case where the second layer is kron(Ry, Ry)\n",
    "ax = fig.add_subplot(1, 2, 1, projection='3d')\n",
    "\n",
    "# Forward propagation to calculate loss function:\n",
    "def cost_yy(para):\n",
    "    L1 = np.kron(ry(np.pi/4), ry(np.pi/4))\n",
    "    L2 = np.kron(ry(para[0]), ry(para[1]))\n",
    "    U = np.matmul(np.matmul(L1, L2), CNOT())\n",
    "    H = np.zeros((2 ** N, 2 ** N))\n",
    "    H[0, 0] = 1\n",
    "    val = (U.conj().T @ H@ U).real[0][0]\n",
    "    return val\n",
    "\n",
    "# Draw an image\n",
    "Z = np.array([[cost_yy([x, y]) for x in X] for y in Y]).reshape(len(Y), len(X))\n",
    "surf = ax.plot_surface(xx, yy, Z, cmap='plasma')\n",
    "ax.set_xlabel(r\"$\\theta_1$\")\n",
    "ax.set_ylabel(r\"$\\theta_2$\")\n",
    "ax.set_title(\"Optimization Landscape for Ry-Ry Layer\")\n",
    "\n",
    "# ============= The second figure =============\n",
    "# We visualize the case where the second layer is kron(Rx, Rz)\n",
    "ax = fig.add_subplot(1, 2, 2, projection='3d')\n",
    "\n",
    "\n",
    "def cost_xz(para):\n",
    "    L1 = np.kron(ry(np.pi/4), ry(np.pi/4))\n",
    "    L2 = np.kron(rx(para[0]), rz(para[1]))\n",
    "    U = np.matmul(np.matmul(L1, L2), CNOT())\n",
    "    H = np.zeros((2 ** N, 2 ** N))\n",
    "    H[0, 0] = 1\n",
    "    val = (U.conj().T @ H @ U).real[0][0]\n",
    "    return val\n",
    "\n",
    "Z = np.array([[cost_xz([x, y]) for x in X] for y in Y]).reshape(len(Y), len(X))\n",
    "surf = ax.plot_surface(xx, yy, Z, cmap='viridis')\n",
    "ax.set_xlabel(r\"$\\theta_1$\")\n",
    "ax.set_ylabel(r\"$\\theta_2$\")\n",
    "ax.set_title(\"Optimization Landscape for Rx-Rz Layer\")\n",
    "\n",
    "\n",
    "plt.show()\n",
    "\n",
    "time_span = time.time() - time_start        \n",
    "print('The main program segment has run in total ', time_span, ' seconds')"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "## More qubits\n",
    "\n",
    "Then, we will see what happens to the sampled gradients when we increase the number of qubits"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 5,
   "metadata": {
    "ExecuteTime": {
     "end_time": "2021-03-02T12:18:13.493641Z",
     "start_time": "2021-03-02T12:15:55.484851Z"
    }
   },
   "outputs": [
    {
     "name": "stdout",
     "output_type": "stream",
     "text": [
      "The main program segment has run in total  90.05470848083496  seconds\n"
     ]
    }
   ],
   "source": [
    "# Hyper parameter settings\n",
    "selected_qubit = [2, 4, 6, 8]\n",
    "samples = 300\n",
    "grad_val = []\n",
    "means, variances = [], []\n",
    "\n",
    "# Record operation time\n",
    "time_start = time.time()\n",
    "\n",
    "# Keep increasing the number of qubits\n",
    "for N in selected_qubit:\n",
    "    grad_info = []\n",
    "    THETA_SIZE = N\n",
    "    for i in range(samples):\n",
    "        class manual_gradient(paddle.nn.Layer):\n",
    "            \n",
    "            # Initialize a list of learnable parameters of length THETA_SIZE\n",
    "            def __init__(self, shape, param_attr=paddle.nn.initializer.Uniform(low=0.0, high=2 * np.pi),dtype='float64'):\n",
    "                super(manual_gradient, self).__init__()\n",
    "\n",
    "                # Convert to Tensor in PaddlePaddle\n",
    "                self.H = paddle.to_tensor(density_op(N))\n",
    "\n",
    "            # Define loss function and forward propagation mechanism  \n",
    "            def forward(self):\n",
    "\n",
    "                \n",
    "                # Initialize three theta parameter lists\n",
    "                theta_np = np.random.uniform(low=0., high= 2 * np.pi, size=(THETA_SIZE))\n",
    "                theta_plus_np = np.copy(theta_np) \n",
    "                theta_minus_np = np.copy(theta_np) \n",
    "\n",
    "                \n",
    "                # Modify to calculate analytical gradient\n",
    "                theta_plus_np[0] += np.pi/2\n",
    "                theta_minus_np[0] -= np.pi/2\n",
    "\n",
    "                # Convert to Tensor in PaddlePaddle\n",
    "                theta = paddle.to_tensor(theta_np)\n",
    "                theta_plus = paddle.to_tensor(theta_plus_np)\n",
    "                theta_minus = paddle.to_tensor(theta_minus_np)\n",
    "\n",
    "                # Generate random targets, randomly select circuit gates in rand_circuit\n",
    "                target = np.random.choice(3, N)      \n",
    "                \n",
    "                U = rand_circuit(theta, target, N)\n",
    "                U_dagger = dagger(U) \n",
    "                U_plus = rand_circuit(theta_plus, target, N)\n",
    "                U_plus_dagger = dagger(U_plus) \n",
    "                U_minus = rand_circuit(theta_minus, target, N)\n",
    "                U_minus_dagger = dagger(U_minus) \n",
    "\n",
    "                \n",
    "                # Calculate analytical gradient\n",
    "                grad = (paddle.real(matmul(matmul(U_plus_dagger, self.H), U_plus))[0][0]  \n",
    "                        - paddle.real(matmul(matmul(U_minus_dagger, self.H), U_minus))[0][0])/2\n",
    "                \n",
    "                return grad      \n",
    "            \n",
    "           \n",
    "        # Define the main program segment    \n",
    "        def main():\n",
    "            \n",
    "            # Set the dimension of QNN\n",
    "            sampling = manual_gradient(shape=[THETA_SIZE])\n",
    "                \n",
    "            # Sampling to obtain gradient information\n",
    "            grad = sampling()\n",
    "                \n",
    "            return grad.numpy()\n",
    "        \n",
    "        if __name__ == '__main__':\n",
    "            grad = main()\n",
    "            grad_info.append(grad)\n",
    "            \n",
    "    # Record sampling information\n",
    "    grad_val.append(grad_info) \n",
    "    means.append(np.mean(grad_info))\n",
    "    variances.append(np.var(grad_info))\n",
    "\n",
    "time_span = time.time() - time_start\n",
    "print('The main program segment has run in total ', time_span, ' seconds')"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 6,
   "metadata": {
    "ExecuteTime": {
     "end_time": "2021-03-02T12:19:16.260635Z",
     "start_time": "2021-03-02T12:19:15.034594Z"
    }
   },
   "outputs": [
    {
     "name": "stdout",
     "output_type": "stream",
     "text": [
      "We then draw the statistical results of this sampled gradient:\n"
     ]
    },
    {
     "data": {
      "image/png": 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      "text/plain": [
       "<Figure size 960x288 with 2 Axes>"
      ]
     },
     "metadata": {
      "needs_background": "light"
     },
     "output_type": "display_data"
    }
   ],
   "source": [
    "grad = np.array(grad_val)\n",
    "means = np.array(means)\n",
    "variances = np.array(variances)\n",
    "n = np.array(selected_qubit)\n",
    "print(\"We then draw the statistical results of this sampled gradient:\")\n",
    "fig = plt.figure(figsize=plt.figaspect(0.3))\n",
    "\n",
    "\n",
    "# ============= The first figure =============\n",
    "# Calculate the relationship between the average gradient of random sampling and the number of qubits\n",
    "plt.subplot(1, 2, 1)\n",
    "plt.plot(n, means, \"o-.\")\n",
    "plt.xlabel(r\"Qubit #\")\n",
    "plt.ylabel(r\"$ \\partial \\theta_{i} \\langle 0|H |0\\rangle$ Mean\")\n",
    "plt.title(\"Mean of {} sampled gradient\".format(samples))\n",
    "plt.xlim([1,9])\n",
    "plt.ylim([-0.06, 0.06])\n",
    "plt.grid()\n",
    "\n",
    "# ============= The second figure =============\n",
    "# Calculate the relationship between the variance of the randomly sampled gradient and the number of qubits\n",
    "plt.subplot(1, 2, 2)\n",
    "plt.semilogy(n, variances, \"v\")\n",
    "\n",
    "# Polynomial fitting\n",
    "fit = np.polyfit(n, np.log(variances), 1)\n",
    "slope = fit[0] \n",
    "intercept = fit[1] \n",
    "plt.semilogy(n, np.exp(n * slope + intercept), \"r--\", label=\"Slope {:03.4f}\".format(slope))\n",
    "plt.xlabel(r\"Qubit #\")\n",
    "plt.ylabel(r\"$ \\partial \\theta_{i} \\langle 0|H |0\\rangle$ Variance\")\n",
    "plt.title(\"Variance of {} sampled gradient\".format(samples))\n",
    "plt.legend()\n",
    "plt.xlim([1,9])\n",
    "plt.ylim([0.0001, 0.1])\n",
    "plt.grid()\n",
    "\n",
    "plt.show()"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "It should be noted that, in theory, only when the network structure and loss function we choose meet certain conditions (unitary 2-design), see paper [[1]](https://arxiv.org/abs/1803.11173), this effect will appear. Then we might as well visualize the influence of choosing different qubits on the optimization landscape:\n",
    "\n",
    "![BP-fig-qubit_landscape_compare](./figures/BP-fig-qubit_landscape_compare.png \"(a) Optimization landscape sampled for 2,4,and 6 qubits from left to right in different z-axis scale. (b) Same landscape in a fixed z-axis scale.\")\n",
    "<div style=\"text-align:center\">(a) Optimization landscape sampled for 2,4,and 6 qubits from left to right in different z-axis scale. (b) Same landscape in a fixed z-axis scale. </div>\n",
    "\n",
    "\n",
    "$\\theta_1$ and $\\theta_2$ are the first two circuit parameters, and the remaining parameters are all fixed to $\\pi$. This way, it helps us visualize the shape of this high-dimensional manifold. Unsurprisingly, the landscape becomes more flat as $n$ increases. **Notice the rapidly decreasing scale in the $z$-axis**. Compared with the 2-qubit case, the optimized landscape of 6 qubits is very flat."
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "_______\n",
    "\n",
    "## References\n",
    "\n",
    "[1] McClean, J. R., Boixo, S., Smelyanskiy, V. N., Babbush, R. & Neven, H. Barren plateaus in quantum neural network training landscapes. [Nat. Commun. 9, 4812 (2018).](https://www.nature.com/articles/s41467-018-07090-4)\n",
    "\n",
    "[2] Cerezo, M., Sone, A., Volkoff, T., Cincio, L. & Coles, P. J. Cost-Function-Dependent Barren Plateaus in Shallow Quantum Neural Networks. [arXiv:2001.00550 (2020).](https://arxiv.org/abs/2001.00550)"
   ]
  }
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